<<TOC>>
** See Also **
* [math] module in [tcllib]
* [tcl::mathfunc]
* [integrate]
* [Stats]
* [converting between rectangular and polar co-ordinates]
* [Fraction math] - [Complex math made simple] (Complex numbers)
* [Sample Math Programs]
* [Binomial coefficients] - including the gamma function.
* [Combinatorial mathematics functions]
* [A set of Set operations]
* [Fast Fourier Transform]
* [Multivariate Linear Regression]
* [Mathematically oriented extensions]
* [pi]
* [Taking the Nth power]
** Average **
arithmetic mean of a list of numbers:
======
proc average L {
expr ([join $L +])/[llength $L].
}
======
Note that empty lists produce a syntax error. The dot behind llength casts it to double
(not dangerous here, as llength will always return a non-negative integer) -- ''RS''
** Binomial coefficient **
Perhaps the '''best''' (what criteria?) should move to the Binomial page and just a pointer to the page should be here?
(This got too long; I'm keeping the best algorithm here, moving the previous discussion to [Binomial Coefficients]. This solution is called ''binom3'' in that page.)
======
proc binom {m n} {
set n [expr {(($m-$n) > $n) ? $m-$n : $n}]
if {$n > $m} {return 0}
if {$n == $m} {return 1}
set res 1
set d 0
while {$n < $m} {
set res [expr {($res*[incr n])/[incr d]}]
}
set res
}
======
** Cross-sum of non-negative integers **
======
proc crosssum {x} {expr [join [split $x ""] +]}
======
Note that this expression may not be braced. (RS)
** Epsilon **
Comparing two floats x,y for equality is most safely done by testing
''abs($x-$y)<$eps'', where eps is a sufficiently small number. You can find out
which ''eps'' is good for your machine with the following code:
======
proc eps {{base 1}} {
set eps 1e-20
while {$base-$eps==$base} {
set eps [expr {$eps+1e-22}]
}
set eps [expr {$eps+1e-22}]
}
% eps 1
5.55112000002e-017 ;# on both my Win2K/P3 and Sun/Solaris
% eps 0.1
6.93889999999e-018
% eps 0.01
8.674e-019
% eps 0.001
1.085e-019
======
** Factorial **
[RS] 2008-01-02: Here's a little example for a user-defined recursive [factorial] function:
======
proc tcl::mathfunc::fac x {
expr {$x<2? 1: $x*fac($x-1)}
}
expr fac(5)
# 120
======
I see a factorial function on 3-4 different pages -some not even about
math. And yet none in the tcllib math library. Perhaps one should be
submitted. How to determine ''best''?
[KBK]: There is indeed a factorial in ::tcllib::math.
It's in some sense 'better' than any of the ones I've seen here on
the Wiki:
* It returns ''exact'' results for factorial x, where x is an integer and 0<=x<=21.
* It returns floating point results for integer x, 22<=x<=170, that are correct to 1 unit in the least significant bit position.
* It returns approximate results, precise to nine significant digits, for all other ''real'' x, x>=0, by using the identity x! = Gamma( x + 1 ). In particular, this precision has been exhaustively verified for all half-integer arguments that give results within the range of IEEE floating point.
* It has companion functions for binomial coefficients, the Gamma function and the Beta distribution that are as precise as it is. Moreover, these functions do ''not'' suffer from premature overflow; they perform well with large arguments: [[choose 10000 100]] doesn't give the function heartburn.
[RS] I like this one, compact but recursive:
======
proc fac n {
expr {$n<2? 1: $n*[fac [expr {$n-1}]]}
}
======
However, this one runs 1/3 faster:
======
proc fac2 n {
expr $n<2? 1: [join [iota 1 $n] *]+0
}
======
given an index generator ''iota'', e.g. ''iota 1 5 => {1 2 3 4 5}''
======
proc iota {base n} {
set res {}
for {set i $base} {$i<$n+$base} {incr i} {lappend res $i}
set res
}
======
However, factorials computed in terms of [expr] are correct only until 12!; above that you get "false positives", negatives, or zeroes.. Of course one could use doubles, which seem to be exact up to 18! (at the maximum [tcl_precision] 17). But the fastest ''fac'' is still tabulated:
======
proc fac3 n {
lindex {
1 1 2 6 24 120 720 5040 40320 362880 3628800 39916800 479001600
479001600.0 87178291200.0 1307674368000.0 20922789888000.0
355687428096000.0 6402373705728000.0
} $n
} ;#-)
======
** Fibonacci numbers **
tcllib::[math] has an iterative version, but here's the "closed form" if anyone
cares:
======
proc fib n {
expr {round(1/sqrt(5)*(pow((1+sqrt(5))/2,$n) - (pow((1-sqrt(5))/2,$n))))}
} ;# RS
======
[Lars H]: Actually, you don't need to compute the second term, since it
always contributes < 1/2 for non-negative ''n''. You can simply do
======
proc fib2 n {
expr {round(1/sqrt(5)*pow((1+sqrt(5))/2,$n))}
}
======
For negative ''n'' it is instead the first term that can be ignored, but one
rarely needs those Fibonacci numbers.
BTW, I also changed an "int" to a "round" in RS's proc (if you're unlucky
with the numerics, "int" can give you one less than the correct answer).
** Integer Check **
see whether variable has an integer value
Since Tcl 8.1.1, the built-in ''string is int'' does the same for a value.
======
proc is_int x {
expr {![catch {incr x 0}]}
}
proc is_no_int x {
catch {incr x 0}
}
======
** Integer maximum **
(MAXINT): determine biggest positive signed integer (by [Jeffrey Hobbs]):
======
proc largest_int {} {
set int 1
set exp 7; # assume we get at least 8 bits
while {$int > 0} { set int [expr {1 << [incr exp]}] }
expr {$int-1}
}
======
** Linear regression and correlation coefficient **
======
proc reg,cor points {
# linear regression y=ax+b for {{x0 y0} {x1 y1}...}
# returns {a b r}, where r: correlation coefficient
foreach i {N Sx Sy Sxy Sx2 Sy2} {set $i 0.0}
foreach point $points {
foreach {x y} $point break
set Sx [expr {$Sx + $x}]
set Sy [expr {$Sy + $y}]
set Sx2 [expr {$Sx2 + $x*$x}]
set Sy2 [expr {$Sy2 + $y*$y}]
set Sxy [expr {$Sxy + $x*$y}]
incr N
}
set t1 [expr {$N*$Sxy - $Sx*$Sy}]
set t2 [expr {$N*$Sx2 - $Sx*$Sx}]
set a [expr {double($t1)/$t2}]
set b [expr {double($Sy-$a*$Sx)/$N}]
set r [expr {$t1/(sqrt($t2)*sqrt($N*$Sy2-$Sy*$Sy))}]
list $a $b $r
} ;#RS
======
** Logarithm to any base **
======
proc log {base x} {
expr {log($x)/log($base)}
} ;# RS
======
** Logarithm to Base Two **
======
proc ld x "expr {log(\$x)/[expr log(2)]}"
======
This is an example of a "live" proc body - the divisor is computed only
once, at definition time. With a single backslash escape needed, it's worth the fun ;-) (RS)
** Maximum and minimum **
======
proc max {a args} {
foreach i $args {if {$i>$a} {set a $i}};return $a
}
proc min {a args} {
foreach i $args {if {$i<$a} {set a $i}};return $a
}
======
Works with whatever < and > can compare (strings included).
Or how about (float numbers only):
======
proc max args {
lindex [lsort -real $args] end
}
proc min args {
lindex [lsort -real $args] 0
}
======
Or, use -dictionary to handle strings, ints, real....
and also allow to be called with a single list arg
(FYI, it's actually a bit faster to use the sort method)
======
proc min args {
if {[llength $args] == 1} {set args [lindex $args 0]}
lindex [lsort -dict $args] 0
}
proc max args {
if {[llength $args] == 1} {set args [lindex $args 0]}
lindex [lsort -dict $args] end
}
======
[RS]: ... only that you get lsort results like
======none
{-1 -5 -10 0 5 10}
======
if you use the '''-dict''' mode of [lsort]. Numeric max/min should rather use -integer or -float.
Max/min of strings must be left to dedicated procs, if ever needed.
** Means of a number list: arithmetic, geometric, quadratic, harmonic **
Should this function move to the Stats page?
======
proc mean L {
expr ([join $L +])/[llength $L].
}
proc gmean L {
expr pow([join $L *],1./[llength $L])
}
proc qmean L {
expr sqrt((pow([join $L ,2)+pow(],2))/[llength $L])
}
proc hmean L {
expr [llength $L]/(1./[join $L +1./])
}
======
where ''qmean'' is the best [braintwister]... For a list of {1 2} the string
======
sqrt((pow( 1 ,2)+pow( 2 ,2))/ 2)
======
(blanks added for clarity) is built up and fed to ''expr'', where it makes a perfectly
well-formed expression if not braced. (RS)
======
proc median L {lindex $L [expr {[llength $L]/2}] } ;# DKF
======
----
[JPS]: That median assumes the list is already sorted. This one doesn't:
======
proc median {l} {
if {[set len [llength $l]] % 2} then {
return [lindex [lsort -real $l] [expr {($len - 1) / 2}]]
} else {
return [expr {([lindex [set sl [lsort -real $l]] [expr {($len / 2) - 1}]] \
+ [lindex $sl [expr {$len / 2}]]) / 2.0}]
}
}
======
** Mid **
[AMG]: Here's a math function I sometimes find useful. It accepts three arguments, and it returns whichever of the three is between the other two. It's mostly useful to clamp a number to a range.
======
proc ::tcl::mathfunc::mid {a b c} {
lindex [lsort -real [list $a $b $c]] 1
}
======
It can also be implemented as a bunch of [[[if]]]s, which is how I do it in [C].
Here is one ''incorrect'' implementation you should watch out for:
======
proc ::tcl::mathfunc::mid {a b c} {
expr {max($a, min($b, $c))}
}
======
This is what Allegro (include/allegro/base.h) has used since the dawn of time. :^( I'm reporting it now; hopefully it'll be fixed. If you're curious, see [http://sourceforge.net/support/tracker.php?aid=1640516] for my writeup.
[KPV] The folk algorithm for finding the middle number (or second highest in a longer list) is to take the
max of the pair-wise mins. To wit:
======
max(min($a,$b), min($a,$c), min($b,$c))
======
[LV] So what is an example of a case in which the second, ''incorrect'', version of the algorithm fails? Answer: "incorrect_mid 1 0 0" returns 1. The problem is it doesn't (always) handle the case where two of the inputs are the same. Doh.
[AMG]: I thought the problem was that it doesn't handle the case of the first input being greater than the other two. This wasn't a problem for Allegro because everyone used its MID macro thus: '''MID(minimum_value, value_to_clamp, maximum_value)'''.
** Numerical functions for [[[expr]]] **
CritLib (see the [Critcl] page) now includes an adapted version of Donal K.
Fellows' extension which lets you write numerical functions for "expr" in Tcl.
See the "mathf" readme [http://www.equi4.com/critlib/mathf.README] - [JCW]
** Prime factors of an integer **
======
proc primefactors n {
# a number x is prime if [llength [primefactors $x]]==1
set res {}
set f 2
while {$f<=$n} {
while {$n%$f==0} {
set n [expr {$n/$f}]
lappend res $f
}
set f [expr {$f+2-($f==2)}]
}
set res
} ;#RS
======
** Random Numbers **
Of course, since 8.0 just say
======
expr {rand()}
======
[Jeffrey Hobbs] has this substitute for pre-8.0 Tcl:
======
set _ran [clock seconds]
proc random {range} {
global _ran
set _ran [expr ($_ran * 9301 + 49297) % 233280]
return [expr int($range * ($_ran / double(233280)))]
}
======
Pass in an int and it returns a number (0..int). Also, the Wiki page on "[rand]" has more on the subject.
** Square Mean and Standard Deviation **
Perhaps this function should move to the Stats page mentioned above?
'''Square mean and standard deviation''':
======
proc mean2 list {
set sum 0
foreach i $list {set sum [expr {$sum+$i*$i}]}
expr {double($sum)/[llength $list]}
}
proc stddev list {
set m [mean $list] ;# see below for [mean]
expr {sqrt([mean2 $list]-$m*$m)}
} ;# RS[LWS] 19 Feb 2021: This stddev gives different results than ::math::statistics::stdev (the latter of which matches a spreadsheet calculation). I'm not sure why, but thought I would point it out in case anyone was going to use it.
======[LWS] 19 Feb 2021: This stddev gives different results than ::math::statistics::stdev (the latter of which matches a spreadsheet calculation). I'm not sure why, but thought I would point it out in case anyone was going to use it.
** Sign of a number **
======
proc sgn {a} {expr {$a>0 ? 1 : $a<0 ? -1 : 0}} ;# rmax
proc sgn x {expr {$x<0? -1: $x>0}} ;# RS
proc sgn x {expr {($x>0)+($x>>31)}} ;# jcw (32-bit arch)
proc sgn x {expr {($x>0)-($x<0)}} ;# rmax again
======
Actually,
======
string compare $a 0
======
seems to give the correct result for all integer values and floating point values not equal to 0.
0.0 (and 0.00 etc) [[string compare 0.0 0]] returns 1, however.
[sergiol]: I was playing codegolf and based on the C answer http://codegolf.stackexchange.com/a/103831/29325 I confirmed it on tcl
======
puts [expr !!$n|$n>>31]
======
can be seen on: http://rextester.com/live/BKGZ8868
** Traditional degrees **
''clock format'' can be put to un-timely uses. As degrees especially in
geography are also subdivided in minutes and seconds, how's this one-liner for
formatting decimal degrees:
======
proc dec2deg x {
concat [expr int($x)] [clock format [expr round($x*3600)] -format "%M' %S\""]
}
======
An additional ''-gmt 1'' switch is needed if you happen to live in a non-integer timezone. (RS)
<<categories>> Mathematics | Arts and Crafts of Tcl-Tk Programming